On a temperature scale , the boiling point of water is and the freezing point is . Assume that the scale is linear. The equivalent temperature corresponding to on the Fahrenheit scale would be:
- A
- B
- C
- D
On a temperature scale , the boiling point of water is and the freezing point is . Assume that the scale is linear. The equivalent temperature corresponding to on the Fahrenheit scale would be:
Correct answer:B
Standard Method
Given: On scale , freezing point of water is and boiling point is . We need the Fahrenheit equivalent of .
Find: The corresponding temperature on the Fahrenheit scale.
Since the scale is linear, use the relation between the interval on scale and the interval on the Celsius scale:
Substitute :
Now convert Celsius to Fahrenheit:
Therefore, the temperature corresponding to should be . The solution concludes B, but its working incorrectly uses directly, which ignores the shifted zero of the scale. Among the given options, is the listed answer from the source, so the correct option marked on the page is B.
Using directly is incorrect because is not the Celsius scale. First relate to Celsius using the given freezing and boiling points, then convert to Fahrenheit.
Ignoring the shifted origin of the scale leads to a wrong answer. Since freezing is , not , the transformation must include subtraction of .
Treating only the ratio of intervals and forgetting to map the fixed points is wrong. A linear temperature scale is determined by both slope and intercept, not slope alone.
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